Determine if the following relations define \( y \) as a function of \( x \). (a) \( x=|5 y| \) (b) \( y=|5 x| \) Part 1 of 2 \( x=|5 y| \) (Choose one) \( \nabla \) a function. Part 2 of 2 \( y=|5 x| \) (Choose one) \( \nabla \) a function.

The relation \( x=|5 y| \) does not define \( y \) as a function of \( x \). For any positive value of \( x \), there are two possible values for \( y \) (one positive and one negative), which violates the definition of a function where each input corresponds to exactly one output. On the other hand, the relation \( y=|5 x| \) does define \( y \) as a function of \( x \). Here, each input value of \( x \) produces a single output value for \( y \) based on its absolute value, fulfilling the requirements of a mathematical function!